Please help, thank you.

Write the logarithmic equation in its equivalent exponential form.
log 0.000001 = –6

because b^logb(x) = x

10^[log 0.000001] = 0.000001
so
0.000001 = 10^-6

Sure! To write the logarithmic equation in its equivalent exponential form, you need to understand the relationship between logarithms and exponents.

In this case, we have the logarithmic equation:
log 0.000001 = -6

To convert it to exponential form, we need to remember that a logarithm is the exponent to which a base must be raised to obtain a specific number. The base of the logarithmic equation is not stated, so we can assume it to be base 10, which is common in most logarithmic functions.

In exponential form, the equation becomes:
10^(-6) = 0.000001

So, the equivalent exponential form of the given logarithmic equation is 10^(-6) = 0.000001.